Shuailing Wang scite author profile

For continued fraction dynamical system [Formula: see text], we give a classification of the underlying space [Formula: see text] according to the orbit of a given point [Formula: see text]. The sizes of all classes are determined from the viewpoints of measure, Hausdorff dimension and topology. For instance, the Hausdorff dimension of the distal set of [Formula: see text] is one and the Hausdorff dimension of the asymptotic set is either zero or [Formula: see text] according to [Formula: see text] is rational or not.

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Dynamical Diophantine approximation of beta expansions of formal Laurent series

Wang

2015

Finite Fields and Their Applications

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Metric and Dimensional Properties of the Badly Approximable Set for Beta-Transformations

Yang

Wang

2019

Fractals

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For any [Formula: see text], let [Formula: see text] be the [Formula: see text]-transformation dynamical system. For any sequence [Formula: see text], we investigate the following badly approximable set: [Formula: see text] In this paper, we determine the Lebesgue measure and Hausdorff dimension of the set [Formula: see text] completely for any [Formula: see text] and any sequence [Formula: see text].

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Shuailing Wang

Synergistic effects of expandable graphite and dimethyl methyl phosphonate on the mechanical properties, fire behavior, and thermal stability of a polyisocyanurate–polyurethane foam

A Construction of the Scrambled Set With Full Hausdorff Dimension for Beta-Transformations

The Distal and Asymptotic Sets for Continued Fractions

Dynamical Diophantine approximation of beta expansions of formal Laurent series

Metric and Dimensional Properties of the Badly Approximable Set for Beta-Transformations

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